Group divisible (K4-e)-packings with any minimum leave
Abstract
A decomposition of Kn(g) L, the complete n-partite equipartite graph with a subgraph L (called the leave) removed, into edge disjoint copies of a graph G is called a maximum group divisible packing of Kn(g) with G if L contains as few edges as possible. We examine all possible minimum leaves for maximum group divisible (K4-e)-packings. Necessary and sufficient conditions are established for their existences.
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